Let's prepare for RMO #2

Number Theory Level 5

Find all positive integers n n for which there exist positive integers x , y x,y and k k such that g c d ( x , y ) = 1 , k > 1 gcd(x,y)=1,k>1 and 3 n = x k + y k 3^{n}=x^{k}+y^{k} .

Submit your answer as sum of all the values of ( x , y , n , k ) (x,y,n,k) .


The answer is 16.

Akshat Sharda by Akshat Sharda , 21, India

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